Irreducible Integrable Modules for the full Toroidal Lie Algebras co-ordinated by Rational Quantum Torus

Abstract

Let Cq be a non-commutative Laurent polynomial ring associated with a (n+1)× (n+1) rational quantum matrix q. Let sld(Cq) HC1(Cq) be the universal central extension of Lie subalgebra sld(Cq) of gld(Cq). Now let us take the Lie algebra τ=gld(Cq) HC1(Cq). Let Der(Cq) be the Lie algebra of all derivations of Cq. Now we consider the Lie algebra τ=τ Der(Cq), called as full toroidal Lie algebra co-ordinated by rational quantum tori. In this paper we get a classification of irreducible integrable modules with finite dimensional weight spaces for τ with nonzero central action on the modules.